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HOMEWORK 5 DUE: Fri., Apr. 30 NAME: DIRECTIONS: • STAPLE this page to the front of your homework (don’t forget your name!). • Show all work, clearly and in order You will lose points if you work is not in order. • When required, do not forget the units! • Circle your final answers. You will lose points if you do not circle your answers. Question Points 1 2 2 2 3 2 4 2 5 2 Total 10 Score Problem 1: (2 point) Consider the differential equation y (4) + 2y ′′′ + y ′′ = 0. Verify that the functions y1 (t) = 1, y2 (t) = t, y3 (t) = e−t , and y4 (t) = te−t are solutions to the equation and determine their Wronskian. y1 (t) = 1 y2 (t) = t y3 (t) = e−t y4 (t) = te−t is is is is a a a a solution solution solution solution since since since since y1′ = 0, y2′′ = 0, (4) y3′ = −e−t , y3′′ = e−t , y3′′′ = −e−t , y3 = e−t , (4) y4′ = (1 − t)e−t , y4′′ = (−2 + t)e−t , y4′′′ = (3 − t)e−t , y4 = (−4 + t)e−t . The Wronskian is given by for any t. W = 1 t 0 1 0 0 0 0 e−t −e−t e−t −e−t te−t (1 − t)e−t (−2 + t)e−t (3 − t)e−t = e−2t 6= 0, Problem 2: (2 points) Let the linear differential operator L be defined by L[y] = a0 y (n) + a1 y (n−1) + · · · + an y, 1 HOMEWORK 5 DUE: Fri., Apr. 30 NAME: where a0 , a1 , ..., an ∈ R. (a) (1 point) Find L[tn ]. n L[t ] = n X ak k=0 n! k t . k! (b) (1 point) Find L[emt ]. L[emt ] = emt n X ak mn−k . k=0 Problem 3: (2 point) Determine four solutions of the equation y (4) − 5y ′′ + 4y = 0. Do you think the four solutions form a fundamental set of solutions? Explain your answer. The characteristic equation is given by m4 − 5m + 4 = 0. This may be factored as m2 − 4 Hence the solution is given by m2 − 1 = 0. y(t) = c1 et + c2 e−t + c3 e2t + c4 e−2t . Since W (et , e−t , e2t , e−2t ) 6= 0 these form a fundamental set of solutions. Problem 4: (2 points) Find the general solution to the differential equation y (5) + 5y (4) − 2y (3) − 10y (2) + y (1) + 5y = 0. The characteristic equation is given by m5 + 5m4 − 2m3 − 10m2 + m + 5 = 0. The possible rational roots of this equation are ± 11 , ± 51 . Plugging these possibilities into the equation, we find that +1, −1, −5 are, in fact, roots. Using synthetic division we factor the equation to obtain (m − 1)2 (m + 1)2 (m + 5) = 0. Hence, the solution is given by y(t) = c1 et + c2 tet + c3 e−t + c4 te−t + c5 e−5t . Problem 5: (2 point) Solve the initial value problem y ′′′ − 8y = 0, subject to y(0) = 0, y ′ (0) = −1, y ′′ (0) = 0. 2 HOMEWORK 5 DUE: Fri., Apr. 30 NAME: The characteristic equation is given by m3 − 8 = 0, which factors as (m − 2)(m2 + 2m + 4) = 0. Hence the general solution is √ √ y(t) = c1 e2t + e−t c2 cos 3t + c3 sin 3t . The initial conditions yield the following system of equations c1 + c2√ 2c1 − c2 + √ 3c3 4c1 − 2c2 − 2 3c3 = = = 0, −1, 0. √ Solving this system yields c1 = −1/6, c2 = 1/6, and c3 = − 3/6. Hence the solution to the initial value problem is given by ! √ √ √ 3 1 2t 1 −t y =− e +e cos 3t − sin 3t . 6 6 6 3
